Weighted Chairman Assignment and Flow-Time Scheduling

Abstract

Given positive integers m, n, a fractional assignment x ∈ [0,1]m × n and weights d ∈ Rn>0, we show that there exists an assignment y ∈ \0,1\m × n so that for every i∈[m] and t∈ [n], \[ |Σj ∈ [t] dj (xij - yij) | < j ∈ [n] dj. \] This generalizes a result of Tijdeman (1973) on the unweighted version, known as the chairman assignment problem. This also confirms a special case of the single-source unsplittable flow conjecture with arc-wise lower and upper bounds due to Morell and Skutella (IPCO 2020). As an application, we consider a scheduling problem where jobs have release times and machines have closing times, and a job can only be scheduled on a machine if it is released before the machine closes. We give a 3-approximation algorithm for maximum flow-time minimization.

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